Time
travel has recently been discussed quite extensively in the context of
general relativity. Time travel can occur in general relativistic models
in which one has closed time-like curves (CTC's). A time like curve is
simply a space-time trajectory such that the speed of light is never
equalled or exceeded along this trajectory.
Time-like curves thus
represent the possible trajectories of ordinary objects. If there were
time-like curves which were closed (formed a loop), then travelling
along such a curve one would never exceed the speed of light, and yet
after a certain amount of (proper) time one would return to a point in
space-time that one previously visited. Or, by staying close to such a
CTC, one could come arbitrarily close to a point in space-time that one
previously visited. General relativity, in a straightforward sense,
allows time travel: there appear to be many space-times compatible with
the fundamental equations of General Relativity in which there are
CTC's. Space-time, for instance, could have a Minkowski metric
everywhere, and yet have CTC's everywhere by having the temporal
dimension (topologically) rolled up as a circle. Or, one can have
wormhole connections between different parts of space-time which allow
one to enter ‘mouth A’ of such a wormhole connection, travel through the
wormhole, exit the wormhole at ‘mouth B’ and re-enter ‘mouth A’ again.
Or, one can have space-times which topologically are R4, and yet have
CTC's due to the ‘tilting’ of light cones (Gödel space-times, Taub-NUT
space-times, etc.)
General relativity thus appears to provide ample
opportunity for time travel. Note that just because there are CTC's in a
space-time, this does not mean that one can get from any point in the
space-time to any other point by following some future directed timelike
curve. In many space-times in which there are CTC's such CTC's do not
occur all over space-time. Some parts of space-time can have CTC's while
other parts do not. Let us call the part of a space-time that has CTC's
the "time travel region" of that space-time, while calling the rest of
that space-time the "normal region". More precisely, the "time travel
region" consists of all the space-time points p such that there exists a
(non-zero length) timelike curve that starts at p and returns to p. Now
let us start examining space-times with CTC's a bit more closely for
potential problems.
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